Random Networks for Communication: From Statistical Physics to Information Systems: 24 (Cambridge Series in Statistical and Probabilistic Mathematics, Series Number 24)
Cambridge University Press, 1/10/2008
EAN 9780521854429, ISBN10: 0521854423
Hardcover, 212 pages, 25.9 x 17.8 x 1.5 cm
Language: English
When is a random network (almost) connected? How much information can it carry? How can you find a particular destination within the network? And how do you approach these questions - and others - when the network is random? The analysis of communication networks requires a fascinating synthesis of random graph theory, stochastic geometry and percolation theory to provide models for both structure and information flow. This book is the first comprehensive introduction for graduate students and scientists to techniques and problems in the field of spatial random networks. The selection of material is driven by applications arising in engineering, and the treatment is both readable and mathematically rigorous. Though mainly concerned with information-flow-related questions motivated by wireless data networks, the models developed are also of interest in a broader context, ranging from engineering to social networks, biology, and physics.
Preface
1. Introduction
2. Phase transitions in infinite networks
3. Connectivity of finite networks
4. More on phase transitions
5. Information flow in random networks
6. Navigation in random networks
Appendix
References
Index.
'The balance between intuition and rigor is ideal, in my opinion, and reading the book is an enjoyable and highly rewarding endeavor ... this book will be useful to physicists, mathematicians, and computer scientists who look at random graph models in which point locations affect the shape and properties of the resulting network: physicists will acquaint themselves with complex networks having rich modeling capabilities (e.g. models for random interaction particle systems such as spin glasses), mathematicians may discover connections of the networks with formal systems (much like the connection of the classical ErdÅ‘s-Rényi random graph properties with first- and second-order logic), and computer scientists will greatly appreciate the applicability of the theory given in the book to the study of realistic, ad hoc mobile networks in which network node connections change rapidly and unpredictably as a function of the geometry of the current node positions.' Yannis Stamatiou, Mathematical Reviews